Wikipedia's discussion of Penrose tiling accessibly describes two key attributes of Penrose' tiling:

- it is aperiodic yet self-similar under scaling ("fractal")
- it has a Fourier transform with discrete five-fold symmetry ("crystalline")

In particular, the self-similar geometry of the Penrose tiling explicitly accords with Benoit Mandelbrot's definition of fractal objects:

**Mandelbrot's definition:** "Fractals are irregular shapes, in either mathematics or the real world, wherein each small part is very much like a reduced-size image of the whole."

Two well-posed concrete questions then arise:

- Does the Fourier transform of an (aperiodic) Penrose tiling show diffraction peaks similar to structures with period long-range order?
- Starting with a single 'seed' tile and adding more tiles by strictly local matching rules, can we grow an arbitrarily large perfect Penrose tiling?

The Penrose tiling has the advantages of being simple and well posed, and moreover the preceding questions generalize naturally to real-world questions like: "By what physical process do atoms find their place in growing real-world quasi-crystals? Do local (classical) matching rules suffice to explain quasi-crystal growth at the atomic level, or are nonlocal (quantum) rules required?' Can real-world quasi-crystals grown by local classical matching rules ever be defect-free? What spatial symmetries determine the pentagonal facets that are seen on real-world quasicrystals?"

With regard to diffraction patterns, recent surveys by Peter Kramer (arXiv:1101.0061) and by Michael Baake and Uwe Grimm (arXiv:1105.0095v1) emphasize the pioneering work of Alan Mackay, whose 1982 article "Crystallography and the Penrose pattern" showed (experimentally) that Penrose tilings exhibit diffraction patterns having ten-fold symmetry; this stimulated an explosion of work that confirmed that such diffraction patterns are generic to quasicrystalline order.

— Mackay's simulated diffraction pattern from a Penrose tiling —

With regard to quasicrystal growth, an accessible entry-point into a large literature is Uwe Grimm's and Dieter Joseph's review "Modelling Quasicrystal Growth" (arXiv:cond-mat/9903074).

A widespread opinion nowadays (one hesitates to call it a 'consensus') is that local matching rules for adding atoms, augmented by remelting processes, permit the growth of quasicrystalline structures having low (but nonzero) defect densities, sufficient to explain the observed growth of macroscopic crystals that exhibit five-fold spatial and Fourier symmetries.

— Ho-Mg-Zn quasicrystal (millimeter background scale) —

Contrary to early speculation, it seems that nonlocal (quantum) effects are *not* required to explain quasicrystal growth on macroscopic scales.

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